Systems and methods for characterizing laser beam quality

ABSTRACT

A measure of the quality of a laser beam is obtained by comparing the power of a theoretical Gaussian beam through a (certain sized area) pinhole to the power of a test beam through a same sized (area) pinhole. The theoretical surrogate Gaussian beam with the same second moment of intensity as the test beam is used to determine the “bucket size” used in “power-in-the-bucket” techniques. The bucket size is an interaction area determined by the wavelength of the laser light, the focusing distance, and the 1/e 2  radius of the near field intensity. The beam quality is determined by taking the square root of the ratio of the theoretical power through a bucket and the actual power through a pinhole with the same size as the bucket. The beam quality of different types of beam profiles can be obtained with a single method or measure.

RELATED APPLICATION

This application is a divisional application of U.S. application Ser. No. 10/701,760, filed Nov. 4, 2003, the entire disclosure of which is incorporated herein by reference.

STATEMENT REGARDING FEDERALLY SPONSORED RESEARCH OR DEVELOPMENT

This invention was made with Government support under contract number DASG60-00-C-0100 awarded by the U.S. Army. The Government has certain rights in this invention.

BACKGROUND

1. Field of the Invention

The present invention relates generally to lasers, and in particular, to characterizing the quality of laser beams.

2. Related Art

Laser beams are used today in a wide range of applications, ranging from eye surgery to the manufacture of semiconductor chips. The various applications typically require different types of lasers, such as solid state lasers, gas lasers, excimer lasers, dye lasers, and semiconductor or diode lasers. Also, depending on the type of laser and/or cavity, the generated beam can be classified by the type or profile, such as top hat, Gaussian, super Gaussian, and other transverse modes or combinations of transverse modes.

Another descriptor of laser beams is beam quality. In many applications, it is important to know something about the laser beam quality, i.e., how the beam departs from a theoretical perfect beam. The beam quality affects how the beam will propagate, as well as how tightly it will focus. Beam quality can worsen from a variety of factors, including misalignment, optics degradation, and laser deterioration. Therefore, with applications in which one needs to know how well the laser can focus the beam in a small interaction area, a measure of beam quality is desirable.

Unfortunately, it is often difficult to obtain a measure of beam quality, as evidenced in part by the numerous methods of determining beam quality. Some known methods include the M² parameter (space-beamwidth product), Strehl ratio, root-mean-squared (RMS) wavefront error or interferometry, and power-in-the-bucket (PIB). These methods all have advantages in some situations and deficiencies in other situations, such as the type of beam to be measured.

For example, the M² parameter has become a commonly used parameter to generally describe near-Gaussian laser beams. Most methods involve obtaining M² by measuring propagation distributions at multiple locations along the beam path. The M² parameter is especially useful in that it allows a prediction of the real beam spot size and average irradiance at any successive plane using simple analytic expressions. This provides system designers with the ability to know critical beam parameters at arbitrary planes in the optical system. However, when the laser beam shows any vignetting effects, e.g., from finite apertures, the M² measurement is not effective. Similarly, for other methods, such as in wavefront interferometry, a good coherence length and stabilized pointing is needed for proper determination of beam quality. Thus, present beam quality measurements are incomplete and inconsistent.

Accordingly, there is a need for a system and method of measuring the quality of laser beams which is suitable for many different types of beams.

SUMMARY

According to one aspect of the present invention, a measure of the quality of a laser beam is obtained by comparing the power of a theoretical Gaussian beam to that of a test beam using the same reference parameters. In one embodiment, power is measured through a pinhole or aperture the same size as a corresponding pinhole for the theoretical Gaussian beam. The area of corresponding beam diameters can also be measured by using a camera to count or determine the number of pixels within a given area. Any suitable camera may be used, such as a digital camera, with software and hardware to count or integrate the pixels within the specified area.

The beam quality, in one embodiment, is determined by taking the square root of the ratio of the power in the theoretical beam to that of the test beam. The farther the measured power deviates from the theoretical power, the lower the beam quality. The power is measured through a pinhole or bucket size (used in power-in-the-bucket techniques) having a diameter corresponding to the 1/e² intensity at focus or the focal point of a transform lens. In this embodiment, the power measurement corresponds to the integrated intensity through the pinhole.

The beam quality can be determined for different types or profiles of laser beams, including Gaussian, top hat, super Gaussian, and combinations of transverse modes. All beams are compared to the lowest order Gaussian mode no matter how the beam is generated, which provides a standard reference to compare different types of beams. This allows a single system, as opposed to multiple systems, to be used for measuring beam quality for different beams. Further, a single system allows a universal measure of beam quality so that comparing the beam quality of different beams is much more easily accomplished.

According to one embodiment, the near field 1/e² size ω_(n) of the beam under test at one focal length in front of the transform lens is determined. Using ω_(n) the focal length of the transform lens, and the wavelength of the light, the waist size at focus (i.e., far field) ω_(f) is calculated. The power of the test beam is measured through a pinhole having a diameter of 2ω_(f). If this is not possible, then a series of power measurements are made through a variety of different size pinholes. These measurements are then normalized (by dividing by the power measured without a pinhole) and fit to a curve or plotted. Using the fit or plot, a normalized power can be obtained at the same bucket size or pinhole as the theoretical Gaussian beam. The beam quality is then determined by taking the square root of the ratio of 0.8647 (or 1-e⁻²) divided by the normalized measured power through the pinhole (or area). This technique is applicable for different types of laser beams and compares the test laser quality with the best possible focus available of beams having the same second moment of intensity.

This invention will be more fully understood in conjunction with the following detailed description taken together with the following drawings.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a flow chart showing a process of determining beam quality according to one embodiment of the present invention;

FIG. 2 is a block diagram of a system for measuring the power used in determining the beam quality according to one embodiment of the invention; and

FIG. 3 is a graph showing a curve of normalized power measurements and a curve of theoretical values, according to one example, for determining beam quality.

Embodiments of the present invention and their advantages are best understood by referring to the detailed description that follows. It should be appreciated that like reference numerals are used to identify like elements illustrated in one or more of the figures.

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

According to one aspect of the present invention, laser beam quality for different types of beams is determined by taking the square root of the ratio between the power in a theoretical Gaussian beam and the power in a test beam. In one embodiment, the power in the theoretical beam is determined from the lowest order Gaussian mode at the 1/e² far-field intensity, i.e., at a relative power level of 0.8647. The power measurement of the test beam is through a pinhole, aperture, or opening of a size corresponding to an aperture size determined from the second moments of intensity of a test beam (or a Gaussian fit to test near field waist diameter). The determined second moments of the test beam are used to determine the 1/e² size (ω_(n)) of the theoretical Gaussian beam in the near field, where ω_(n) is the near-field waist spot size. The measured power is then normalized (divided by total power) to a relative ratio between 0 and 1. In one embodiment, the beam quality (BQ) is determined by taking the square root of 0.8647 divided by the relative measured power through a pinhole having a diameter two times ω_(f) (the far-field waist spot size, to be discussed below), as given by equation 1 below:

$\begin{matrix} \begin{matrix} {{B\; Q} = \sqrt{\frac{\left( \frac{\int_{0}^{2\;\pi}{\int_{0}^{\omega_{f}}{{I_{theory}(r)}\ r{\mathbb{d}r}\ {\mathbb{d}\theta}}}}{\int_{0}^{2\;\pi}{\int_{0}^{\infty}{{I_{theory}(r)}r\ {\mathbb{d}r}\ {\mathbb{d}\theta}}}} \right)}{\left( \frac{\int_{0}^{2\;\pi}{\int_{0}^{\omega_{f}}{{I_{measured}(r)}\ r{\mathbb{d}r}\ {\mathbb{d}\theta}}}}{\int_{0}^{2\;\pi}{\int_{0}^{k\;\omega_{f}}{{I_{measured}(r)}\ r{\mathbb{d}r}\ {\mathbb{d}\theta}}}} \right)}}} \\ {= \sqrt{\frac{0.8647}{\left( \frac{\int_{0}^{2\;\pi}{\int_{0}^{\omega_{f}}{{I_{measured}(r)}\ r{\mathbb{d}r}\ {\mathbb{d}\theta}}}}{\int_{0}^{2\;\pi}{\int_{0}^{k\;\omega_{f}}{{I_{measured}(r)}\ r{\mathbb{d}r}\ {\mathbb{d}\theta}}}} \right)}}} \\ {= \sqrt{\frac{0.8647}{P\; I\; B}}} \end{matrix} & (1) \end{matrix}$ where PIB is the measured power using the power-in-the-bucket (PIB) method. For a Gaussian beam, the intensity is given as follows:

$\begin{matrix} {{I_{theory}(r)} = {\frac{2\; P}{\pi\;\omega_{f}^{2}}{\exp\left\lbrack {{- 2}\left( \frac{r}{\omega_{f}} \right)^{2}} \right\rbrack}}} & (2) \end{matrix}$ where P is the power, ω_(f) is the far-field waist size radius, and r is the distance. The evaluation of the numerator in equation (1) is from the well-known 1/e² far-field criterion. The BQ number of equation (1) relates the square root of the ratio of power collected in an area of a perfectly focused Gaussian beam to the test beam. A beam quality of 1 corresponds to a “perfect” beam, with higher BQ numbers associated with lower quality beams.

FIG. 1 is a flow chart showing a process of determining beam quality of a laser beam (the test beam) according to one embodiment. In step 100, the near-field waist spot size ω_(n) is determined for the test beam using a second moment of intensity to determine the 1/e² size or using a fit to Gaussian. In one embodiment, the near-field spot size ω_(n) is obtained at one focal length in front of the transform lens by any suitable method, such as scanning across a knife or reference edge with a photodetector positioned behind or using a camera to determine the diameter of the beam. A fit to Gaussian or second moment can also be used. After the near-field spot size ω_(n) is determined, the far-field waist size ω_(f) is calculated in step 102 according to the following equation:

$\begin{matrix} {\omega_{f} = \frac{\lambda*F}{\pi*\omega_{n}}} & (3) \end{matrix}$ where λ is the wavelength of the laser, F is the focal length of the transform lens, and ω_(n) is the near-field waist size radius.

Once the far-field waist size ω_(f) radius is obtained, a determination is made in step 104 as to whether a measurement is possible through a pinhole of diameter 2ω_(f). If this is possible, e.g., a pinhole having the exact or very similar size is available, the power at one focal length from the transform lens is measured through the pinhole in step 106, such as with a conventional detector or power meter behind the pinhole. The measured power is then normalized in step 108 by dividing the power measured through the pinhole with the power measured without going through a pinhole. In one embodiment, the power measurements are called power-in-the-bucket (PIB) values, i.e., percentage of beam power in the main or central lobe and not in the wings.

If no pinhole is available with a diameter of approximately 2ω_(f), as determined in step 104, then a series of measurements are made at one focal length behind the transform lens through pinholes of varying diameters, in step 110. A series of measurements through pinholes having diameters both less than and greater than 2ω_(f) allows an approximation to be made. In one embodiment, measurements are taken through at least three different sized pinholes, although other numbers that allow an adequate approximation to be made may also be suitable. At a minimum, two measurements may be suitable for some applications; however, with only two measurements, the fit will be a linear fit and accuracy may be reduced. Once the measurements are made, the values are normalized by dividing by the measured power without going through a pinhole, in step 112. The normalized values are then plotted or fitted, such as to a third order polynomial, in step 114. The normalized PIB through a pinhole diameter of 2ω_(f) is then determined by the plotted or fitted data, such as by extrapolation, in step 116.

Once the normalized power is determined, the square root of the fractional power (0.8647) of a theoretical Gaussian beam through a pinhole diameter of 2ω_(f) divided by the measured or estimated measured power of the test beam through a pinhole diameter of 2ω_(f) is calculated in step 118. This number is a measure of the beam quality of the test beam. A “perfect” beam would yield a measured normalized power of 0.8647 (or 1-e⁻²) for a beam quality value of 1.0. With a less than perfect beam quality, there will be less than 86% of the beam energy through the 2ω_(f) waist size pinhole. With smaller normalized power values, the beam quality indicator increases. Therefore, higher numbers correspond to increasingly lower quality beams.

FIG. 2 shows a diagram of a system 200 for measuring the power used in determining the beam quality according to one embodiment of the invention. System 200 includes a laser 202 that generates a test beam 204. Laser 202 is not limited to any one type of laser, but may be selected from different types of lasers, such as, but not limited to solid state lasers, gas lasers, excimer lasers, dye lasers, and semiconductor or diode lasers. Similarly, test beam 204 can be different types of beams, such as, but not limited to Gaussian, super Gaussian, top hat, and different combinations of transverse modes. Test beam 204 impinges on a beam splitter 206 that directs a portion of the beam to a power meter reference 208 used to normalize laser power fluctuations during measurements, with another portion of the beam passing through beam splitter 206 toward a transform lens 210 with focal length f. Located one focal length in back of transform lens 210 is a test area 212, where the various sized pinholes are placed for the power measurement. Test area 212 may include an apparatus that transfers opaque sheets with various size pinholes used for the power measurements. A power meter 214 is positioned directly behind test area 212 to measure the power out of a pinhole.

Processors, calculators, or other suitable devices can then be used to process the measured values to obtain the beam quality. For example, a processor that runs a program implementing, e.g., the steps in FIG. 1, can receive the measured data and execute the steps to determine the beam quality. In addition, a machine-readable medium, such as a semiconductor memory or storage disk, can be used to store instructions to execute the operations for determining beam quality according to the invention, e.g., as shown in FIG. 1. The machine-readable medium can then be accessed (or read) by a processor or other machine which then executes the instructions to obtain the beam quality value. Such processors (not shown) can be coupled to power meter 214 of FIG. 2 to allow the processor to access measurement values from power meter 214 in order to execute the operations needed for determining the beam width quality. Further, a processor may be configured to receive a machine-readable medium, for example, a computer with a disk drive that allows the medium to be read and used by the computer.

EXAMPLE

In FIG. 2, assume laser 202 is a solid state Yb:YAG laser and laser beam 204 is a beam that is a combination of transverse modes with a wavelength of 1.03 microns. Transform lens 210 has a focal length f or F of 1 meter. The near-field waist or spot size ω_(n) is approximately 2.35 mm at one focal length or one meter in front of transform lens 210, as determined from step 100 of FIG. 1. The near-field waist size ω_(n) is then transformed to a corresponding far-field waist size ω_(f) according to equation (3) above. With λ approximately 1.03×10⁻⁶ m, F approximately 1 m, and ω_(n) approximately 2.35×10⁻³ m, ω_(f) is equal to approximately 139.5 microns. A series of six power measurements are then made through pinholes having diameters of 100, 200, 300, 500, 600, and 1000 microns, along with a power measurement without a pinhole. The measured powers are shown in Table 1 below:

TABLE 1 Pinhole diameter (μm) Power Measurement (mW) No pinhole 323 1000  248 600 198 500 182 300 140 200 89 100 30

The pinhole or “bucket size” is normalized with the bucket size of the diameter 2ω_(f) at 1/e² of the theoretical Gaussian beam, i.e., the pinhole diameter is divided by 2ω_(f), resulting in fractional bucket size values. The power measurements are also normalized by dividing the measured power through the pinhole with the measured power without a pinhole. The numbers are then fit to a third order polynomial and plotted, as shown in FIG. 3. Line 300 represents the theoretical value or a “perfect” beam, while line 302 represents the measured test beam. At a fractional bucket size of 1 (corresponding to the 1/e² waist size), theoretical line 300 shows a normalized integrated energy or power of 0.8647. With the test beam of this example, the fractional bucket size of 1 corresponds to a normalized power of 0.3695. This results in a beam quality of 1.53 ([0.8647/0.3695]^(1/2)).

One of the advantages of the present invention is that it allows a single method to measure beam quality for many or all different types of beams, thereby providing a standard reference to compare beam quality across different beams. Currently, different methods are used to measure beam quality for different beams, which makes it hard to compare and contrast beam qualities with different beams. Table 2 below shows sample values obtained using the method of the present invention to measure beam quality compared to the M² method.

TABLE 2 Beam Profile BQ (present invention) M² Gaussian 1 1 Top Hat 1.1827 >4 Doughnut 1.8234 2 Doughnut with linear 1.0440 1.4362 polarization Table 2 shows that the beam quality measurement of the present invention can be used to determine the BQ of different types of beams and still yield useful and accurate results. This is in contrast to conventional beam quality techniques, which do not produce accurate results for certain types of beams. For example, as shown in Table 2, the beam quality measurement using the M² technique yields an M² value greater than 4 for a top hat beam profile, while the beam quality measurement of the present invention gives a BQ value of 1.1827, which is a much more accurate representation of the quality of a top hat beam.

The above-described embodiments of the present invention are merely meant to be illustrative and not limiting. It will thus be obvious to those skilled in the art that various changes and modifications may be made without departing from this invention in its broader aspects. For example, values obtained by taking the square root of the ratio of theoretical power to normalized measured power is described above. However, other quantities for determining beam quality according to the present invention may also be suitable, such as taking powers of the ratio other than a square root and using pinholes with diameters other than 2ω_(f). Therefore, the appended claims encompass all such changes and modifications as fall within the true spirit and scope of this invention. 

1. A method of determining beam quality for different types of laser beams, comprising: providing a theoretical value for a Gaussian laser beam; determining a diameter for an a circular opening corresponding to the theoretical value for the Gaussian laser beam through the opening, wherein the diameter is twice a far-field waist size; determining a normalized power value for a test laser beam through an a circular opening with the diameter; calculating the ratio of the theoretical value to the normalized power value for the test laser beam to obtain the beam quality of the test laser beam; and storing data related to the calculated beam quality in a storage medium.
 2. The method of claim 1, wherein determining the diameter comprises: determining a near-field waist size ω_(n); and determining the far-field waist size ω_(n) from the near-field waist size ω_(n).
 3. The method of claim 2, wherein determining the far-field waist size is calculated from ${\omega_{f} = \frac{\lambda*F}{\pi*\omega_{n}}},$ where λ is the wavelength of the test laser beam and F is the focal length of a transform lens.
 4. The method of claim 2, wherein determining the near-field waist size comprises measuring the test laser beam at one focal length in front of a transform lens.
 5. The method of claim 1, further comprising calculating the square root of the ratio.
 6. The method of claim 1, wherein determining the normalized power comprises dividing a measured power through an opening by a measured power without an opening.
 7. The method of claim 6, further comprising measuring power through a plurality of different size openings.
 8. A system for measuring beam quality of a laser beam, comprising: a transform lens located at least one focal length in front of a laser to be measured; a sheet with a circular opening located approximately one focal length in back of the transform lens, wherein the circular opening has a diameter twice that of a far-field waist size; a means for measuring the power of the laser beam through the opening; and a means for comparing the measured power with a theoretical value for a Gaussian beam to obtain the beam quality of the laser beam.
 9. The system of claim 8, wherein the laser beam can be at least two different types of beams.
 10. The system of claim 8, wherein the means for comparing comprises a processor configured to provide the theoretical value for the Gaussian beam, determine a diameter for a first opening corresponding to the theoretical value for the Gaussian beam through the first opening, determine a normalized power value for the laser beam through an opening with the first diameter, and calculate the ratio of the theoretical value to the normalized power value for the laser beam to obtain the beam quality of the laser beam.
 11. The system of claim 8, wherein the means for measuring comprises a power meter.
 12. The system of claim 8, wherein the means for measuring comprises a camera.
 13. A method of determining beam quality for different types of laser beams, comprising: providing a theoretical value for a Gaussian laser beam; determining a diameter for an opening corresponding to the theoretical value for the Gaussian laser beam through the opening, wherein determining the diameter comprises: determining a near-field waist size ω_(n); and determining a far-field waist size ω_(n) from the near-field waist size ω_(n), wherein the diameter is twice the far-field waist size, wherein determining the far-field waist size is calculated from ${\omega_{f} = \frac{\lambda*F}{\pi*\omega_{n}}},$  where λ is the wavelength of the test laser beam and F is the focal length of a transform lens; determining a normalized power value for a test laser beam through an opening with the diameter; calculating the ratio of the theoretical value to the normalized power value for the test laser beam to obtain the beam quality of the test laser beam; and storing data related to the calculated beam quality in a storage medium. 